Geometric Hardy inequalities for the sub-elliptic Laplacian on convex domains in the Heisenberg group

Abstract

We prove geometric Lp versions of Hardy's inequality for the sub-elliptic Laplacian on convex domains in the Heisenberg group Hn, where convex is meant in the Euclidean sense. When p=2 and is the half-space given by , > d this generalizes an inequality previously obtained by Luan and Yang. For such p and the inequality is sharp and takes the form equation ∫ |∇Hnu|2 \, d ≥ 14∫ Σi=1n Xi(), 2+ Yi(), 2dist(, ∂ )2|u|2\, d, equation where dist(\, ·\,, ∂ ) denotes the Euclidean distance from ∂ .